課程名稱︰代數一 課程性質︰數學系選修 可抵必修代數導論一 課程教師︰林惠雯教授 開課學院：理學院 開課系所︰數學系 考試日期（年月日）︰106.1.9 考試時限（分鐘）：3 hours 試題 : 1. (15%) Let M be any abelian group. (a) Show that Hom (Z, M) is isomorphic to M. Z (b) Let n be a positive integer and M = {x in M|nx = 0}. Show that n Hom (Z/nZ, M) is isomorphic to M . Z n (c) Determine Hom (Z/nZ, Z/mZ) for n,m in N. Z 2. (15%) Let 1 → N → E → G → 1 be an extension of an abelian group N by a 2 group G. Show that if H (G, N) = 0, then E is a semidirect product of N and G. 3. (15%) Show that the number of irreducible characters of a finite group G is equal to the number of distinct conjugacy classes of G. 4. (20%) (a) Show that every irreducible representation of a finite group G is contained in the regular representation of G with multiplicity equal to its degree. (b) Show that |K|χ(g') Σ ρ(g) = --------- Id g in K χ(1) where ρ is an irreducible representation of a finite group G with character χ, and K is a conjugacy class of G and g' is in K. 5. (25%) Determine the character tables of S and D . (Justify your answer) 4 6 6. (15%) Let a group G act on Z trivially and A be a Z[G]-module. Define the augmentation map ε: Z[G] → Z by ε(Σm x) = Σm . Let I be the kernel of ε. x x Show that Z(tensor_Z[G])A is isomorphic to A/IA. 7. (10~30%) In case you are not confident that you can get over 60 points from the above questions, state and show anything you have prepared. -- 正妹也不過就是一組物質波方程式的特解罷了 -- ※ 發信站: 批踢踢實業坊(ptt.cc), 來自: 140.112.211.228 ※ 文章網址: https://www.ptt.cc/bbs/NTU-Exam/M.1484399128.A.C98.html